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Check if a number is divisible by 3

Is it true that a binary number is divisible by 3 iff it has an even number of ones? like 11000 is divisible by 3 whereas 1110 is not.

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marked as duplicate by Darin Dimitrov, MAK, Paul R, Bahbar, Vladimir Nov 3 '10 at 10:25

This question has been asked before and already has an answer. If those answers do not fully address your question, please ask a new question.

Did you try for 5? – Pascal Cuoq Nov 3 '10 at 10:12

2 Answers 2

No - there is a trick but it's a little more complicated than that - you have to count the number of 1s at even positions and the number of 1s at odd positions. See e.g.

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Thanks a lot. I see now. – Marley Nov 3 '10 at 20:42
@RoyiNamir: it looks like someone else has already given a good explanation: – Paul R Aug 12 at 11:30
@RoyiNamir: you might need to read it carefully (and more than once), and maybe sketch it out as you go. The information is all there though. Try it with a few examples on paper. – Paul R Aug 12 at 11:35
@PaulR Now that I read it again. it doesn't answer the question. It explains the odd and even bits thingy. One of the comments (after my question was - "If so - how did 0x55555556 i get in there?" and one answered : "0x55555556 is a fixed-point representation of 1/3." which wasn't mentioned in the answer - and let me to think about it from another POV.Anyway - the answer doesn't answer what i asked. I asked explicitly about how ((int) (i * 0x55555556L >> 30) & 3) == 0 work. Anyway thank you for your time. – Royi Namir Aug 12 at 19:19

No, that's wrong. For example 5_dec = 101_bin is not divisble by 3. To check for divisbility by three, you have to count the number of ones in even position and substract the number of ones in odd positions. If the difference is divisble by three, the original number is divisbilble by three (which, in turn, can be checked by reiterating the same rule).

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I see. Thanks plenty. – Marley Nov 3 '10 at 20:46

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